View
219
Download
2
Category
Preview:
Citation preview
International Journal of Advance Research In Science And Engineering http://www.ijarse.com
IJARSE, Vol. No.4, Special Issue (01), March 2015 ISSN-2319-8354(E)
1063 | P a g e
SELECTION OF WORKING FLUID AND EXERGY
ANALYSIS OF AN ORGANIC RANKINE CYCLE
Aseem Desai1, Deepa Agrawal
2,
Sauradeep Datta3, Sanjay Rumde
4
1,2,3,4 Mechanical Engineering Department, Maharashtra Institute of Technology ( India)
ABSTRACT
There are two degrees of freedom available in designing an Organic Rankine Cycle (O.R.C) - the organic fluid
and the evaporator pressure. The upper limit of the latter will be decided by the heat source inlet temperature.
The performance of 12 organic fluids including some newly developed silicone oils - D4, MDM, have been
analyzed on the basis of thermal efficiency, exergy destruction (neglecting pressure drop) and size of the system
required. The optimum evaporator pressure was found for each fluid using power output as the objective
function. The source was taken as a flue gas mixture at 150˚C. The exergy destruction due to two irreversibility
–heat transfer across a finite temperature difference and pressure drop in a shell and tube heat exchanger was
quantified only for R245fa and recalculated for varying source exit temperature. The average tube side heat
transfer coefficient and that for liquid-only were obtained from HTRI software for a given geometry. The
pressure drop in the shell was obtained using Bell-Delaware method and that in the tube was calculated
separately for the single phase and two phase part.
Keywords: Evaporator, Exergy analysis, Organic Rankine Cycle
I. INTRODUCTION
The need for better efficiencies in power plants has never been greater. With drastic climate change occurring
all over the world, we need to reduce dangerous emissions into the atmosphere. More than 50% waste heat is
unused; converting some of this heat into work can attenuate the problem by reducing the consumption of fossil
fuels [1]. Another solution to this problem is the use of renewable sources of energy, like solar and geothermal,
which are low grade heat sources. The operation at lower temperatures requires an organic fluid in the power
cycle. Organic fluids have much lower normal boiling point than water hence is suitable for low temperature
applications. Also organic fluids have lower specific volume as compared to steam hence the corresponding
size of the components of the power plant will be considerably smaller.
The importance of exergy is often ignored but as per the Carnot corollary, maximum work is developed only
when the irreversibility's are eradicated. Increasing the exit temperature of the source increases the Log Mean
Temperature Difference (LMTD) in the evaporator and hence reduces its size. The reduced size and mass flux
should give lower pressure drop. Hence, while the exergy destruction due to the temperature difference
increases with increase in source exit temperature, the pressure drop irreversibility reduces with the same [2].
International Journal of Advance Research In Science And Engineering http://www.ijarse.com
IJARSE, Vol. No.4, Special Issue (01), March 2015 ISSN-2319-8354(E)
1064 | P a g e
Nomenclature Subscripts
Q heat transfer rate (KW) 1,2,2s,3,4,4s,5,6,7,8 states in system
h mass flow rate of hot fluid (kg/s) e evaporator
c mass flow rate of hot fluid (kg/s) c condenser
cw mass flow rate of cooling water(kg/s) p pump
h enthalpy (KJ/kg) LO liquid only
S entropy (KJ/kgK) g flue gas
η efficiency l liquid refrigerant
W work energy (KJ)
T temperature (˚C)
To surrounding temperature
Ф heat Recovery Efficiency
Δ finite change in quantity
P pressure (Pa)
Nb number of baffles
μ viscosity (Pa-s)
ρ mean density (kg/m3)
ρi density at inlet (kg/m3)
ρo density at outlet (kg/m3)
G mass flux (kg/m2)
l length of tube (m)
rh hydraulic radius (m)
XLM Lockhart-Martinelli parameter
N number of tubes in evaporator
Uavg overall heat transfer coefficient
do outer diameter of tube
Texit flue gas exit temperature
Cph specific heat at constant pressure for hot fluid (KJ/kgK)
As surface area of evaporator
exergy destruction rate (KW)
x dryness fraction
friction factor
Re Reynolds Number
Cf correction factor
Nu Nusselt number
Pr Prandtl number
International Journal of Advance Research In Science And Engineering http://www.ijarse.com
IJARSE, Vol. No.4, Special Issue (01), March 2015 ISSN-2319-8354(E)
1065 | P a g e
Another factor is the heat transfer coefficient whose variation may have a drastic effect on the size of the heat
exchanger and hence on the exergy destruction.
Many researches have worked on fluid selection for an ORC, Hung et al [3] found the thermal efficiencies of
Benzene, Toluene, p-xylene, R113 and concluded that p-xylene had the maximum and benzene has the
minimum efficiency. He also found that p-xylene had the lowest overall irreversibility and that maximum
irreversibility was present in the evaporator. Wang et al [1] conducted a multi-objective optimization
considering heat exchanger surface area per unit power output and the heat recovery efficiency and surmised
that R141b is the optimal fluid if the source inlet temperature is greater than 180˚C. Lars et al [4] considered
the variation of thermal efficiency with critical temperature and found that they had an increasing relationship.
Dai et al [5] showed that R236ea had the highest exergy efficiency and that for fixed input source conditions,
the maximum power is obtained at a certain optimum evaporator pressure. Larjola et al [6] showed that for a
larger two-phase enthalpy drop in the evaporator, the irreversibility in it will be greater. Wei et al [7] analyzed
the effect of variation in source parameters like mass flow rate and inlet temperature of the exhaust of an IC
engine, on the exergy destruction and thermal efficiency for R245fa.
In this study the fluid selection and exergy analysis (neglecting pressure drop in the evaporator) has been
extended to some more fluids like D4, MDM, and R141b etc. The fluids containing chlorine have not been
considered in this paper due to their high ODP. In addition the exergy destruction due to pressure drop in a shell
and tube heat exchanger was also considered for R245fa. The occurrence of a trade-off has been checked for the
given source conditions. The exit temperature of the source was varied and the corresponding exergy destruction
in the evaporator was plotted. The effect of increasing the temperature difference between hot and cold fluids in
the heat exchanger, on the heat transfer coefficient and size is also shown.
II. MODEL OF AN ORGANIC RANKINE CYCLE
Schematic diagram of the organic rankine cycle as shown in fig. 1 consists of an evaporator driven by low-grade
heat source, an expander, a condenser and a working fluid pump. The working fluid is pumped into the
evaporator where it is heated and vaporised by the waste heat. The high pressure vapour enters the expander
without any superheat, where the vapour gets expanded and power is generated. After this the exhaust vapour
enters the condenser while it is still in the superheated state, where it gets condensed by cooling water and then
it is pumped back to the evaporator and a new cycle begins.
Fig. 1. Schematic diagram of ORC
International Journal of Advance Research In Science And Engineering http://www.ijarse.com
IJARSE, Vol. No.4, Special Issue (01), March 2015 ISSN-2319-8354(E)
1066 | P a g e
2.1 Source and Sink Conditions
The waste heat source considered here is a flue gas mixture. The flue gas inlet temperature is assumed constant
at 150˚C. A constant pinch of 7˚C was taken between the hot and cold fluid at the point at which two phase flow
begins on the cold side. The condenser temperature is kept constant at 50˚C. Since pinch of 5˚C is maintained,
cooling water exit temperature is taken as 45˚C. Due to limitations of the cooling tower the cooling water inlet is
kept at 35˚C.
2.2 Thermodynamic Analysis
The thermodynamic processes involved in a basic subcritical ORC are illustrated in fig. 2. 1-2 and 3-4
(represented by dotted lines) indicate the actual processes, whereas 1-2s and 3-4s indicate the ideal reversible
processes.
Process 4-1: This process represents a constant pressure heat addition in evaporator. The heat absorbed by
working fluid in the evaporator is:
= = (1)
Process 1-2: The high pressure vapour working fluid from the evaporator enters the expander where mechanical
power is developed. Power developed by the expander is:
= (2)
Expander efficiency (ɳe) has been assumed as 70%.
Process 2-3: This process represents a constant pressure heat rejection in condenser. The heat rejected by the
working fluid in the condenser is:
= (3)
Process 3-4: This process indicates actual pumping process. The power consumed by the pump is:
(4)
The pump efficiency (ɳp) has been assumed to 60%.
Fig. 2. T-S diagram of ORC system with heat source and cooling water
International Journal of Advance Research In Science And Engineering http://www.ijarse.com
IJARSE, Vol. No.4, Special Issue (01), March 2015 ISSN-2319-8354(E)
1067 | P a g e
2.3 Selection of Working Fluid
Selection of correct working fluid is a very important aspect to be considered before designing the ORC.
Organic fluids have lower normal boiling points and hence have very high pressures at moderate temperatures
facilitating a positive pressure difference in the evaporator. The higher pressure also results in lower specific
volumes and hence smaller size of the components. The fluid must also be selected on the basis of the source
conditions, as the critical temperature of the fluid may be much smaller or larger than the source temperature.
One of the important thermodynamic attributes of the organic fluid is the slope of the saturation vapour curve.
On this basis organic fluids are classified into dry, wet and isentropic fluids. For dry fluids, the slope of the
saturated vapour line is positive. Some examples of dry fluids are R245fa, isobutene, R141b, toluene, p-xylene.
For wet fluids, the slope of the saturated vapour line is negative. Some examples of wet fluids are water,
ethanol, R152. For isentropic fluids, the slope of the saturation vapour curve is infinity. Some examples of
isentropic fluids are R134a, R125, R245ca.
Due to the negative slope of saturated vapour curve of the wet fluids in the T-S diagram, the exit state of the
fluid from the turbine is often wet. This problem is eliminated for organic fluids since at the exit of the turbine
the fluid is always superheated. Another benefit is that the exit temperature of the fluid from the turbine is
usually higher than that of the fluid at the exit of the pump. Hence there is some scope for improving the
efficiency by introducing regeneration. Unlike the wet fluids no bleed is required from the turbine and hence he
fluid expands completely in the turbine. The performance of fluids is evaluated based on three parameters:
Thermal efficiency, Maximum power output, Exergy destruction.
2.3.1 Thermal Efficiency Analysis of Various Working Fluids
The thermal efficiency for various working fluids has been calculated based on the thermodynamic model
describe previously, using a Matlab program. The fluid properties were obtained by using REFPROP (9.1)
software which was linked with Matlab. In this text evaporator temperature refers to the temperature at which
boiling starts (T1, T9).
Fig. 3. Thermal efficiency of various fluids plotted against evaporator temperature (at which boiling
starts) varying from 50˚C up to the critical temperature of particular working fluid
International Journal of Advance Research In Science And Engineering http://www.ijarse.com
IJARSE, Vol. No.4, Special Issue (01), March 2015 ISSN-2319-8354(E)
1068 | P a g e
2.3.2 Analysis of Maximum Power Output for various working fluids
The evaporator temperature adds a restriction on the lowest possible heat source exit temperature. This is
because the maximum temperature difference at pinch point is taken as 7˚C. For an ORC, the pinch point is the
point at which evaporation begins or the point at which dryness fraction is zero.
The net power output is a product of thermal efficiency and heat duty. As evaporator temperature increases
thermal efficiency increases and simultaneously heat duty decreases. Hence it is required to find the evaporator
temperature corresponding to which maximum power output is obtained. As the evaporator temperature
increases the heat recovery efficiency decreases.
Heat recovery efficiency (Ø) is the ratio of the available energy to the maximum usable energy.
(5)
As heat recovery efficiency increases thermal efficiency decreases. Thus, the thermal efficiency and heat
recovery efficiency are inversely related.
Fig. 4. Shows the variation of output power with change in evaporator temperature for various working
fluids
The power output for various working fluids has been calculated using a Matlab program and the temperature
for maximum power has been noted.
2.3.3. Exergy Analysis for Entire Cycle
Exergy refers to the total available energy. The efficiency is not an accurate parameter for defining the
maximum power producing capacity of an ORC. For this, we need to quantify the irreversibility's by using the
exergy destruction. In each of the 4 components, there is some irreversibility.
The exergy destruction is always equal to product of net entropy generation rate and surrounding temperature.
(6)
International Journal of Advance Research In Science And Engineering http://www.ijarse.com
IJARSE, Vol. No.4, Special Issue (01), March 2015 ISSN-2319-8354(E)
1069 | P a g e
• In the evaporator, there is an exchange of heat between a finite temperature difference (Flue gas and
Organic fluid), ideally another heat engine could be added between these two temperature source and sink,
and more work could be extracted. The drop in pressure due to friction in the pipes also results in some
work lost in fighting friction.
(7)
• Similarly the friction between viscous fluid and blades in the turbine also results in some work lost.
(8)
• In the condenser, there is net entropy generation due to heat transfer across a finite temperature difference,
this time between the organic fluid and cooling water.
(9)
• Finally the friction between the impeller blades in the pump and the organic fluid results in some entropy
generation.
(10)
The exergy destruction is defined as the product of environment temperature and the net entropy generation. The
net entropy generation is calculated in each component after assuming suitable isentropic efficiencies in the
turbine and pump. The pressure drop in the heat exchangers is neglected.
(11)
As the evaporator temperature increases, the total exergy destruction decreases because the temperature
difference between the heat source and the organic fluid reduces along with the mass flow rate of organic fluid
in the cycle. Unfortunately the total heat recovered from the source also reduces. Hence lower irreversibility will
be obtained at the cost of lower heat recovery efficiency and lower power developed. It can also be concluded
that for fluids with higher critical temperature, the two phase enthalpy drop is larger and so is the exergy
destruction in the evaporator, yet since the LMTD is larger, a smaller heat exchanger required.
Fig. 5. Represents the overall entropy destruction rate as a function of evaporator temperature for
various organic fluids.
International Journal of Advance Research In Science And Engineering http://www.ijarse.com
IJARSE, Vol. No.4, Special Issue (01), March 2015 ISSN-2319-8354(E)
1070 | P a g e
Table 1 shows the maximum power output and thermal efficiency for the various working
along with certain thermo-physical property
Fluids Molecular
Weight
(g/mol)
Slope of
Saturated
vapour
Line
( )
Critical
Pressure
(bar)
Critical
Temper
ature
(˚C)
Specific
Volume at
intermediate
temperature
of 85˚C
(m3/kg)
Overall
Thermal
Efficiency
for
Te=120˚C
And
Tc=50˚C
(%)
Maximum
Power
output
(KW)
Evaporator
Temperature
at which
power is
maximum
Water 18.0153 Negative 220.64 373.95 0.1 24.88 64.25 95.07
Isobutane 58.12 Positive 36.29 134.66 0.0262 8.47 75.43 103.729
R245fa 134.05 Positive 36.51 154.01 0.0242 10.35 74.36 99.98
MDM 193.24 Positive 14.15 290.94 0.33 12.72 72.43 97.788
D4 296.62 Positive 13.32 313.34 0.58 13.49 72.22 97.04
R134a 102 Isentropic 37.61 72.71 0.0064 5.26 108.83 99.06
R141b 117 Positive 42.12 204.35 0.0617 14.34 70.02 97.22
R125 120 Isentropic 36.18 66.02 0.0025 1.07 23.15 64.023
R245ca 134.05 Isentropic 39.41 174.42 0.0478 11.78 73.07 98.968
Toluene 92.14 Positive 41.26 318.60 0.4340 20.17 68.82 95.322
R152a 66.1 Negative 45.17 113.26 0.0121 6.63 104.11 111.261
R236ea 152.03 Negative 34.2 139.29 0.0155 8.98 76.87 102.374
III. MODEL OF EVAPORATOR
The evaporator considered is a shell and tube heat exchanger. The working fluid flows through the tubes and the
flue gas flows through the shell enclosure. The shell diameter and corresponding tube count has been selected
by using ‘Heat Transfer Research, Inc. (HTRI)’ software after supplying the process condition which includes
the constant evaporator temperature of 120˚C. The shell Diameter was taken as 1150 mm, with a pitch of 25 mm
for a 45˚ staggered tube configuration, the tube count was 728. The tube diameter was taken as 19 mm and
thickness as 1.5mm. The shell type was ‘E’, Front End-‘B’, Rear End-‘S’ and the baffle spacing was taken as
International Journal of Advance Research In Science And Engineering http://www.ijarse.com
IJARSE, Vol. No.4, Special Issue (01), March 2015 ISSN-2319-8354(E)
1071 | P a g e
330mm. The source exit temperature was varied from 127˚C up to 147˚C. The corresponding overall heat
transfer coefficient and the liquid-only heat transfer coefficient was also obtained from HTRI for a finite number
of source exit temperatures.
(12)
These values take into consideration the effect of heat flux on sub-cooled nucleate boiling region and flow
boiling region. The flow boiling process is very complicated as, when the local heat flux reaches a critical heat
flux (CHF), the wall starts becoming dry. Based on the region in which CHF is reached the drying out process is
called Departure from nucleate boiling (DNB) or Dry-out, the former occurring at low dryness fraction and the
latter at higher dryness fraction [10]. In the Matlab program, all geometrical parameters other than length were
held constant and the heat transfer coefficient values for intermediate points was found by interpolation. The
heat duty reduces along with the mass flow rate and mass flux as the source exit temperature is increased.
(13)
The total length and that of the two phase portion and single phase portion was then found using the equations
given below:
(14)
(15)
The values of tube side average heat transfer coefficient obtained are plotted against source exit temperature as
shown below in fig. 6.
Fig. 6. Shows tube side average heat transfer coefficient versus flue gas exit temperature
The heat transfer coefficient for the flue gas was assumed to be constant since the free flow area in the shell
remains unchanged and also because the variation in properties is minimum. It was found using McAdams
correlation [9].
(16)
(17)
International Journal of Advance Research In Science And Engineering http://www.ijarse.com
IJARSE, Vol. No.4, Special Issue (01), March 2015 ISSN-2319-8354(E)
1072 | P a g e
Equivalent heat transfer coefficient (Ueq) is calculated considering tube side average heat transfer, shell side
heat transfer and conduction through the tube wall, in parallel.
IV. PRESSURE DROP EVALUATION IN EVAPORATOR
4.1 Shell Side
Bell Delaware method has been used to estimate the pressure drop due to friction. The pressure drop evaluation
on the shell side of a shell and tube heat exchanger is complicated due to the presence of a cross-flow section, a
window section and the inlet and exit sections. The total pressure drop is then the sum of the pressure drops for
each window section and each cross-flow section, the number of such sections is decided by the number of
baffles or baffle spacing. Empirical correlations for the total pressure drop including the cross-flow, window and
the inlet-exit sections [8, 9] are:
(18)
A Matlab program has been developed to obtain the pressure drop in the shell using the above equation. This
was done after the total length of the heat exchanger was found in each iteration. In fig. 7 based on our process
conditions and considering working fluid as R245fa the total pressure drop on shell side is obtained as 73.7Kpa
at a source exit temperature of 127˚C. Pressure drop due to static head is also taken into account and the
corresponding value obtained is 133Pa.
Fig. 7. Total shell side pressure drop with respect to source exit temperature
The step nature of the graph in fig. 7 is because the value of number of baffles can only be a whole number even
though the length may vary continuously.
4.2 Tube Side (Single Phase)
The pressure drop inside the tubes is determined by using (19, 20):
International Journal of Advance Research In Science And Engineering http://www.ijarse.com
IJARSE, Vol. No.4, Special Issue (01), March 2015 ISSN-2319-8354(E)
1073 | P a g e
(19)
(entrance effect) (momentum effect) (core effect) (exit effect)
Where, Fanning friction factor is:
(20)
The momentum pressure drop has been found to be negligible and has not been considered. Also the combined
effect due to the pressure drop at the entrance and exit is very small and has hence been neglected. Hence the
pressure drop in the core is the major contributor to the total tube side pressure drop. A Matlab program has
been developed to obtain the pressure drop in tubes, with single phase consideration, using the above equations.
4.3 Tube Side (Two Phase)
For Pressure Drop calculations in tube side considering two phase the following pressure drop correlation [10]
has been used:
(21)
(22)
(23)
The term Lo2
represents the two phase multiplier. The Lockhart- Martinelli method (21, 22) is among the oldest
techniques. It assumes that the two phase multipliers are the functions of the Martinelli parameter equation as
shown by (23). The phasic frictional gradients depend on the flow regimes of the phases, when each is assumed
to flow alone in the channel. A Matlab program has been developed to obtain the pressure drop in tubes with
two phase consideration using (21, 22 and 23).
The pressure drop on tube side due to friction (with combined single phase and two phase) is obtained as 4.25Pa
for a source of temperature of 127˚C. It is observed that for increase in flue gas exit temperature the tube side
pressure drop decreases. Pressure drop is a function of length of the tube and mass flux. In this case the mass
flux continuously decreases with increase in flue gas exit temperature but the length fluctuates with respect to
the same. The results in fig. 8 shows that the effect of mass flux dominates.
Fig. 8. Represents the total pressure drop in tube side for working fluid R245fa
International Journal of Advance Research In Science And Engineering http://www.ijarse.com
IJARSE, Vol. No.4, Special Issue (01), March 2015 ISSN-2319-8354(E)
1074 | P a g e
Pressure drop due to static head has also been taken into account based on our process conditions and working
fluid as R245fa.
V EXERGY DESTRUCTION IN THE EVAPORATOR CONSIDERING PRESSURE DROP
The procedure to calculate pressure drop in a shell and tube heat exchanger has been elucidated above. The exit
state of the organic fluid in the evaporator is now calculated considering the pressure drop with respect to the
inlet and taking the exit state to be saturated vapour (x=1).
Fig. 9. Represents entropy destruction rate in evaporator versus flue gas exit temperature
The effect of pressure drop on the source exit temperature was not considered and the entropy at the exit was
calculated after deducting the pressure drop from the inlet pressure. Comparing the exergy destruction due all
three irreversibility's separately, we found that the pressure drop in the shell is the dominant contributor
followed by the temperature difference in the evaporator and then the pressure drop in the tube, in descending
order.
(24)
(25)
Hence the total exergy destruction has a generally decreasing trend similar to that of pressure drop in shell, with
a local minima and maxima. Yet for other heat sources with similar properties (volumetric thermal expansion
coefficient) compared to the organic fluid, there might actually be more similar exergy destruction due to
temperature difference and pressure drop and hence a trade-off may occur. Further it must be pointed out that
there is a lot of flexibility in the rating procedure used, which will have a pronounced effect on the size of the
heat exchanger and hence pressure drop. Finally the effect of the temperature difference in the evaporator must
be highlighted, as the heat flux increases, sub-cooled nucleate boiling is enhanced along with the heat transfer
coefficient but on further increase of heat flux, DNB occurs and the insulating vapour film along the inner
periphery of the tube will result in a sharp decrease in heat transfer coefficient. This phenomena in-turn affects
the length.
International Journal of Advance Research In Science And Engineering http://www.ijarse.com
IJARSE, Vol. No.4, Special Issue (01), March 2015 ISSN-2319-8354(E)
1075 | P a g e
VI. CONCLUSION
• When the heat source parameters are fixed, the selection of the fluid should be based on the power output
rather than the thermal efficiency. Maximum thermal efficiency was obtained for Toulene, R141b, D4,
MDM, R245ca in decreasing order. Maximum power was obtained for Iso-Butane, Toluene, R236ea,
R245fa in decreasing order. Hence even though the thermal efficiency for R245fa is considerably lower
than the rest it has a high power output.
• Considering expansion in the turbine, at 85˚C, from 120˚C saturated condition, R125, R134a, R236ea had
the lowest specific volumes in increasing order.
• Minimum overall exergy destruction (neglecting pressure drop in the evaporator) was obtained for R245fa,
R245ca, R134a in increasing order. The fluids which had maximum power output, i.e. Iso-butane, Toluene
and R236ea all had much higher overall exergy destruction. Hence a suitable weightage must be added to
each parameter and the sum should be evaluated before selecting the fluid.
• It was found that the exergy destruction for R245fa due to pressure drop in the shell of the heat exchanger,
was the much larger, even though the pressure drops are comparable on both sides. The partial derivative
is very different for the flue gas and the organic fluid and the mass flow rate is very high. Hence the
expected exergy trade-off was not found.
REFERENCES
[1] Z. Q. Wang, N. J. Guo and X. Y. Wang, Fluid selection and parametric optimization of organic rankine
cycle for low temperature waste heat, Energy, 40, 2012, 107-115.
[2] Adrian Bejan, George Tsatsaronis and Michael Moran, Thermal Design and Optimization (John Wiley and
Sons, Inc., NJ: Hoboken, 1996).
[3] Tzu-Chen Hung, Waste heat recovery of Organic Rankine Cycle using dry fluids, Energy Conversion and
Management, 42, 2001, 539-553.
[4] Lars J. Brasz and William M. Bilbow, Ranking of working fluids for organic rankine cycle applications,
International Refrigeration and Air Conditioning conference, 2004, 722-780.
[5] Yiping Dai, Jiangfeng Wang and Lin Gao, Parametric optimization and comparative study of organic
rankine cycle (ORC) for low grade waste heat recovery, Energy Conversion and Management, 50, 2009,
576-582.
[6] J. Larjola, Electricity from industrial waste heat using high speed Organic Rankine Cycle (ORC),
Production Economics, 41, 1995, 227-235.
[7] Donghong Wei, Xuesheng Lu, Zhen Lu and Jianming Gu, Performance analysis and optimization of
organic Rankine cycle (ORC) for waste heat recovery, Energy Conversion and Management, 48, 2007,
1113–1119.
[8] Ramesh K. Shah and Dusan P. Sekulic, Fundamentals of heat exchanger design (John Wiley and Sons,
Inc., NJ: Hoboken, 2003).
International Journal of Advance Research In Science And Engineering http://www.ijarse.com
IJARSE, Vol. No.4, Special Issue (01), March 2015 ISSN-2319-8354(E)
1076 | P a g e
[9] Sadic Kakac and Hongton Liu, Heat Exchangers: selection, rating and thermal design, 2nd
ed (CRC
Press,NJ: United States of America, 2002).
[10] S. Mostafa Ghiaasiaan, Two-Phase Flow, Boiling and Condensation in Conventional and Miniature
Systems (Cambridge University Press, NJ: New York, 2008).
Recommended